Classical Statistical simulation of Quantum Field Theory
Takayuki Hirayama
TL;DR
This paper introduces a classical statistical simulation method for quantum field theory, using complex Gaussian noises to compute n-point functions, linking classical and quantum energy concepts.
Contribution
It presents a novel classical simulation approach for quantum field theory computations using complex Gaussian noises.
Findings
Provides a classical procedure to compute quantum n-point functions.
Links classical energy configurations with quantum zero point energy.
Offers a new perspective on simulating quantum phenomena classically.
Abstract
We propose a procedure of computing the n-point function in perturbation theory of the quantum field theory as the average over the complex Gaussian noises in a classical theory. The complex Gaussian noises are the sources for the creation and annihilation of particles and the energy of the resultant configuration is the same as the zero point energy of the corresponding quantum field theory.
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Taxonomy
TopicsQuantum Mechanics and Applications · Statistical Mechanics and Entropy